Multi-amplifier circuit

ABSTRACT

A transimpedance amplifier circuit comprises a first amplifier having an input, an output and a first transconductance. A second amplifier has an input that communicates with the output of the first amplifier, an output and a second transconductance. A first resistance has one end that communicates with the input of the first amplifier. A third amplifier has an input that communicates with the output of the second amplifier, an output and a third transconductance. A fourth amplifier has an input that communicates with the output of the third amplifier, an output and a fourth transconductance. An inverter has an input that communicates with the output of the fourth amplifier and an output that communicates with an opposite end of the first resistance.

CROSS-REFERENCE TO RELATED APPLICATIONS

This application is a divisional of U.S. patent application Ser. No. 10/792,619, filed on Mar. 3, 2004, now U.S. Pat. No. 7,276,969, issued Oct. 2, 2007. The disclosure of the above application is incorporated herein by reference.

FIELD OF THE INVENTION

The present invention relates to amplifier circuits, and more particularly to multi-stage amplifier circuits.

BACKGROUND OF THE INVENTION

Referring now to FIGS. 1 and 2, a transimpedance amplifier (TIA) circuit is shown and includes an inverting amplifier having a transconductance g_(m), a load resistance R_(L), and a feedback resistance R_(f). As is known, the TIA circuit converts an input current I_(in) to an output voltage V_(o). Several characteristics of the amplifier circuit in FIG. 1 are described below, including gain, input impedance, output impedance, and noise. The gain of the amplifier circuit:

${Gain} = {\frac{v_{o}}{i_{in}} = {{- R_{f}} + {\frac{1}{g_{m}}.}}}$ For many implementations, R_(f) is much larger than

$\frac{1}{g_{m}}$ such that the gain is essentially equal to −R_(f).

The input impedance R_(in) of the amplifier circuit of FIG. 1 is as follows:

$R_{in} = {\frac{1}{g_{m}}\left( {1 + \frac{R_{f}}{R_{L}}} \right)}$ Thus, the input impedance R_(in) is a function of the load resistance R_(L), as well as the feedback resistance R_(f) and the transconductance g_(m). The output impedance R_(o) is equal to

$\frac{1}{g_{m}}$ at low frequency. However, due to parasitic capacitance C₁, the output impedance increases to the value of the feedback resistance R_(f) for frequencies greater than

$\frac{1}{R_{f}C_{1}},$ as is illustrated generally in FIG. 2.

Assuming the feedback resistance R_(f) is much greater than

$\frac{1}{g_{m}},$ the noise at the input of the amplifier circuit is:

${Noise} = \frac{4\;{KT}}{g_{m}}$ Thus, the noise is independent of the feedback resistance R_(f) and the load resistance R_(L), and inversely related to the transconductance g_(m). Note that K is Boltzmann's constant and T is temperature. Therefore, reducing noise generally involves increasing the transconductance g_(m).

One advantage of the amplifier circuit of FIG. 1 is that while noise is closely related to the transconductance g_(m), the input impedance R_(in) is not. Therefore, noise can be set to a desired level by adjusting the transconductance g_(m). The desired input impedance R_(in) can then be obtained by adjusting the feedback and load resistances R_(f) and R_(L), respectively. In this sense, the noise and input impedance of the amplifier circuit of FIG. 1 are relatively independent.

In contrast, the input impedance and noise of differential TIAs are both dependent on the transconductance g_(m). Specifically, the input impedance R_(in) is equal to

$\frac{1}{g_{m}}$ and the noise is equal to

$\frac{4\;{KT}}{g_{m}}.$ Accordingly, adjusting the noise level will affect the input impedance and vice versa in differential TIAs.

Referring now to FIG. 3, it is difficult to obtain high gain from a transimpedance amplifier while maintaining relatively flat input impedance and noise levels at high frequencies. As noted above, to have low noise, the transconductance g_(m) must be relatively large. For most transistors, the transconductance g_(m) is given by the following equation:

$g_{m} = \sqrt{\frac{2\;{KIW}}{L}}$ Where W is width, L is length, and I is current. To increase the transconductance g_(m), the width W of the device and/or the current I can be increased. As can be seen from the following equations, however, the width W is proportional to the parasitic capacitances C₁ and C₂: C₁=C_(ox)WL; and C₂∝W. Where C_(ox) is oxide capacitance. Thus, increasing the width W to increase the transconductance g_(m) also increases the parasitic capacitances C₁ and C₂. The effects of the larger parasitic capacitances on circuit performance (specifically input impedance, gain, and bandwidth) are discussed further below.

Referring now to FIG. 4, the general equation for input impedance is set forth above. However, if the value of capacitance C₂ increases, at some frequency it shunts the load resistance R_(L) such that the equation for input impedance becomes:

$R_{in} = {\frac{1}{g_{m}}\left( {1 + \frac{R_{L}C_{2}}{R_{L} + C_{2}}} \right)}$

FIG. 4 illustrates this relationship. As shown therein, the input impedance is initially flat. As frequency increases, the impedance of capacitor C₂ decreases and begins to reduce the impedance of the parallel combination of capacitor C₂ and the load resistance R_(L). This, in turn, increases the input impedance R_(in) starting at a frequency of about

$\frac{1}{C_{2}R_{L}}.$ At even higher frequencies, the input impedance may drop off due to circuit performance, as shown in FIG. 4. Thus, one problem with the amplifier circuit of FIG. 1 is that reducing noise also requires increasing the transconductance g_(m). Increasing the transconductance g_(m), in turn, increases the parasitic capacitance and can adversely impact the input impedance R_(in) at certain frequencies.

Referring now to FIG. 5, to achieve high gain, a high feedback resistance R_(f) is typically needed. However, the transistor has an output impedance r_(o) and a load impedance R_(L). Usually R_(L) is much greater than r_(o). The equation for r_(o) is:

$r_{o} = {\frac{T \cdot L}{g_{m}}.}$ Where T represents a constant typically having a value of about 100 and L represents the length of the device. Therefore, given a value for

$\frac{1}{g_{m}}$ of 5 ohms and a device length of 0.25 microns, r_(o) will be approximately 125 ohms. Assuming the load impedance R_(L) is infinite, the equation for input impedance R_(in) is:

$R_{in} = {{\frac{1}{g_{m}}1} + {\left( \frac{R_{f}\left( {R_{L} + r_{o}} \right)}{R_{L}r_{o}} \right).}}$ If an input impedance of 50 ohms is used, the feedback resistance R_(f) is limited to approximately 1125 ohms.

Increasing the size of the device adversely impacts the input impedance R_(in) at high frequencies because of the increased capacitance. Increasing the size of the device also limits the value of the load impedance R_(L). Limiting R_(L) also limits the value of the feedback resistance R_(f) and adversely impacts the gain at DC.

Referring now to FIG. 6, in order to derive the bandwidth of an amplifier with feedback, an open loop response technique is used to provide information relating to the bandwidth and maximum achievable bandwidth of a circuit. The DC gain of the open loop response is determined by opening the feedback loop and attaching a voltage source to one end of the feedback loop as shown in FIG. 6. The output voltage is sensed at the other end of the feedback loop.

To derive the bandwidth, the DC gain of the open loop response and the first dominant pole P₁ are found. Assuming stable operation, there is only one pole P₁ that is located below a crossover frequency. The crossover frequency is the product of the DC gain of the open loop response and the first dominant pole P₁. The crossover frequency defines the bandwidth of the closed loop amplifier. The maximum available bandwidth is related to the second non-dominant pole P₂.

Referring now to FIG. 7, the response of the amplifier circuit of FIG. 6 is shown. The DC gain of the open loop response is g_(m)R_(L) and the circuit has a dominant pole at

$\frac{1}{R_{f}\left( {C_{1} + C_{2}} \right)}.$ Multiplying the DC gain of the open loop response with P₁ provides a crossover frequency of

$\frac{g_{m}R_{L}}{R_{f}\left( {C_{1} + C_{2}} \right)}.$ Further the circuit arrangement has a non-dominant pole at

$\frac{1}{C_{L}R_{2}},$ which relates to a barrier frequency or maximum achievable bandwidth. Increasing the transconductance g_(m) increases the parasitic capacitances C₁, C₂. If the load impedance R_(L) is less than the feedback resistance R_(f), then the second component of the equation (i.e.,

$\left( {{i.e.},\frac{R_{L}}{R_{f}}} \right)$ is less than unity. Thus, it should be understood that there is a maximum bandwidth that can be obtained, which is basically

$\frac{g_{m}}{C},$ which limits the speed of the circuit.

SUMMARY OF THE INVENTION

A transimpedance amplifier circuit comprises a first amplifier with an input, an output and a first transconductance. A second amplifier has an input that communicates with the output of the first amplifier, an output and a second transconductance. A first resistance has one end that communicates with the input of the first amplifier. An inverter has an input that communicates with the output of the second amplifier and an output that communicates with an opposite end of the first resistance.

In other features, the first transconductance is greater than the second transconductance. A second resistance has one end that communicates with the input of the second amplifier and an opposite end that communicates with the output of the second amplifier. A third resistance has one end that is connected to the output of the second amplifier.

In still other features, a first capacitance has one end that communicates with the one end of the first resistance and an opposite end that communicates with the opposite end of the first resistance.

A transimpedance amplifier circuit comprises a first amplifier with an input, an output and a first transconductance. A second amplifier has an input that communicates with the output of the first amplifier, an output and a second transconductance. A first resistance has one end that communicates with the input of the first amplifier. A third amplifier has an input that communicates with the output of the second amplifier, an output and a third transconductance. A fourth amplifier has an input that communicates with the output of the third amplifier, an output and a fourth transconductance. An inverter has an input that communicates with the output of the fourth amplifier and an output that communicates with an opposite end of the first resistance.

In other features, the first transconductance is greater than the second transconductance and the second transconductance is greater than the third and fourth transconductances. The second transconductance is approximately equal to one-fourth of the first transconductance. The third and fourth transconductances are approximately equal to one-twelfth of the first transconductance.

In yet other features, a second resistance has one end that communicates with the input of the second amplifier and an opposite end that communicates with the output of the second amplifier. A third resistance has one end that communicates with the input of the fourth amplifier and an opposite end that communicates with the output of the fourth amplifier. A first capacitance has one end that communicates with the one end of the first resistance and an opposite end that communicates with an opposite end of the first resistance.

A differential transimpedance amplifier circuit comprises a first amplifier with an input, an output and a first transconductance. A second amplifier has an input that communicates with the output of the first amplifier, an output and a second transconductance. A first resistance has one end that communicates with the input of the first amplifier. A second resistance has one end that communicates with the input of the second amplifier and an opposite end that communicates with the output of the second amplifier. A third amplifier has an input, an output and a third transconductance. A fourth amplifier has an input that communicates with the output of the third amplifier, an output and a fourth transconductance. A third resistance has one end that communicates with the input of the third amplifier. A fourth resistance has one end that communicates with the input of the fourth amplifier and an opposite end that communicates with the output of the fourth amplifier. An opposite end of the first resistance communicates with the opposite end of the fourth resistance. An opposite end of the third resistance communicates with the opposite end of the second resistance.

In other features, the first and third transconductances are greater than the second and fourth transconductances, respectively. A first capacitance has one end that communicates with the one end of the first resistance and an opposite end that communicates with the opposite end of the first resistance. A second capacitance has one end that communicates with the one end of the third resistance and an opposite end that communicates with the opposite end of the third resistance.

A differential transimpedance amplifier circuit comprises a first amplifier with an input, an output and a first transconductance. A second amplifier has an input that communicates with the output of the first amplifier, an output and a second transconductance. A first resistance has one end that communicates with the input of the first amplifier. A second resistance has one end that communicates with the input of the second amplifier and an opposite end that communicates with the output of the second amplifier. A third amplifier has an input, an output and a third transconductance. A fourth amplifier has an input that communicates with the output of the third amplifier, an output and a fourth transconductance. A third resistance has one end that communicates with the input of the third amplifier. A fourth resistance has one end that communicates with the input of the fourth amplifier and an opposite end that communicates with the output of the fourth amplifier. A fifth amplifier has an input that communicates with the output of the second amplifier, an output and a fifth transconductance. A sixth amplifier has an input that communicates with the output of the fifth amplifier, an output and a sixth transconductance. A seventh amplifier has an input that communicates with the output of the fourth amplifier, an output and a seventh transconductance. An eighth amplifier has an input that communicates with the output of the seventh amplifier, an output and a eighth transconductance. An opposite end of the first resistance communicates with the output of the eighth amplifier. An opposite end of the third resistance communicates with the output of the sixth amplifier.

In other features, the first and third transconductances are greater than the second and fourth transconductances, respectively. The second and fourth transconductances are greater than the fifth and sixth and the seventh and eighth transconductances, respectively. The second and fourth transconductances are approximately equal to one-fourth of the first and third transconductances, respectively. The fifth and sixth transconductances and the seventh and eighth transconductances are approximately equal to one-twelfth of the first and second transconductances, respectively.

In still other features, a first capacitance has one end that communicates with the one end of the first resistance and an opposite end that communicates with the opposite end of the first resistance. A second capacitance has one end that communicates with the one end of the third resistance and an opposite end that communicates with the opposite end of the third resistance. A fifth resistance that has one end that communicates with the input of the sixth amplifier and an opposite end that communicates with the output of the sixth amplifier. A sixth resistance that has one end that communicates with the input of the eighth amplifier and an opposite end that communicates with the output of the eighth amplifier.

Further areas of applicability of the present invention will become apparent from the detailed description provided hereinafter. It should be understood that the detailed description and specific examples, while indicating the preferred embodiment of the invention, are intended for purposes of illustration only and are not intended to limit the scope of the invention.

BRIEF DESCRIPTION OF THE DRAWINGS

The present invention will become more fully understood from the detailed description and the accompanying drawings, wherein:

FIG. 1 is an electrical schematic of a transimpedance amplifier circuit according to the prior art;

FIG. 2 is a graph illustrating output impedance as a function of frequency for the amplifier circuit of FIG. 1;

FIG. 3 is an electrical schematic of a transistor with parasitic capacitances according to the prior art;

FIG. 4 is a graph illustrating input impedance as a function of frequency for the amplifier of FIG. 1;

FIG. 5 is an electrical schematic illustrating the output resistance of the transistor of FIG. 3;

FIG. 6 is the amplifier circuit of FIG. 1 in an open loop response configuration;

FIG. 7 illustrates the open loop response of the circuit shown in FIG. 6;

FIG. 8 is an electrical schematic of an amplifier circuit according to one embodiment of the present invention;

FIG. 9 is an electrical schematic of a differential circuit implementation of the circuit of FIG. 8;

FIG. 10 is a graph illustrating input impedance as a function of frequency for the differential circuit of FIG. 9;

FIG. 11 illustrates the open loop response of the differential circuit of FIG. 9;

FIG. 12 is an electrical schematic of an amplifier circuit according to another embodiment of the present invention;

FIG. 13 is a graph illustrating the output impedance as a function of frequency for the differential circuit of FIG. 9;

FIG. 14 is an electrical schematic of an amplifier circuit including additional amplifier stages according to yet another embodiment of the present invention;

FIG. 15 illustrates the open loop response of the circuit of FIG. 14;

FIG. 16 is an electrical schematic of a differential circuit implementation using the circuit of FIG. 14;

FIG. 17 is a functional block diagram of the multiple amplifier circuit according to the present invention that is implemented in a read head of a disk drive system; and

FIG. 18 is a functional block diagram of the multiple amplifier circuit according to the present invention that is implemented in a low noise amplifier (LNA) of a wireless device.

DETAILED DESCRIPTION OF THE PREFERRED EMBODIMENTS

The following description of the preferred embodiment(s) is merely exemplary in nature and is in no way intended to limit the invention, its application, or uses. For purposes of clarity, the same reference numbers will be used in the drawings to identify similar elements.

An amplifier circuit according to one embodiment of the present invention is illustrated in FIG. 8 and is designated by reference number 100. The circuit 100 includes a first amplifier 102 having a transconductance g_(m1) and a second amplifier 104 having a transconductance g_(m2). The first and second amplifiers 102, 104 are connected in series. Specifically, an output 108 of the first amplifier 102 is coupled to an input 110 of the second amplifier 104.

An output 112 of the second amplifier 104 is coupled to an input 114 of the first amplifier 102 through a feedback circuit 116. The feedback circuit 116 includes a feedback resistance R_(f) and an inverter 106. In one implementation, the inverter 106 has a gain equal to −1, although other gain values can be used. A resistance R₂ is coupled in parallel with the second amplifier 104. Also shown in FIG. 8 are parasitic capacitances C₁, C₂, and C₃. An input current source I_(in) 126 is coupled to the input terminal 114 of the first amplifier 102. A load resistance R_(L) is coupled to the output terminal 112 of the second amplifier 104. In this implementation, g_(m1) is preferably greater than g_(m2). The amplifiers 102, 104 can be inverting CMOS amplifiers (although other transistor types may be used), and the parasitic capacitances C₁ and C₂ are preferably much larger than the parasitic capacitance C₃.

Referring now to FIG. 9, a differential circuit 200 corresponding to the circuit 100 shown in FIG. 8 is illustrated. The differential circuit 200 includes a first set of amplifiers 202, 204 connected in series and having transconductances g_(m1) and g_(m2), respectively. A second set of amplifiers 206, 208 are connected in series and have transconductances g_(m1) and g_(m2), respectively. An output 210 of the first set of amplifiers is coupled to an input 212 of the second set of amplifiers through a feedback resistance R_(f). An output 214 of the second set of amplifiers is coupled to an input 216 of the first set of amplifiers through a feedback resistance R_(f). Negative feedback is achieved by feeding the output 210 from the first set of amplifiers to the input 212 of the second set of amplifiers 206, 208, and vice versa.

The effective transconductance g_(m−eff) of the differential circuit 200 of FIG. 9 is given by the following equation:

$g_{m - {eff}} = {\frac{g_{m}R_{2}}{\frac{R_{L}}{{g_{m\; 2}R_{L}} + 1}}\mspace{45mu} \approx {g_{m\; 2} \cdot g_{m\; 1} \cdot {R_{2}.}}}$ Therefore, the overall transconductance for the differential circuit 200 is greater than the amplifier circuit that is shown in FIG. 1. Even if amplifiers 202, 206 have the same transconductance g_(m) as the amplifier of FIG. 1, the overall transconductance g_(m−eff) is the product of this transconductance multiplied by g_(m2) and R₂ for the circuit of FIG. 9.

The input impedance for the differential circuit of FIG. 9 is as follows:

$R_{in} = \left. {\frac{1}{g_{m\_ eff}}\left( {1 + \frac{Rf}{R_{L}}} \right)}\Rightarrow{{\frac{1}{g_{m\; 2}g_{m\; 1}R_{2}}\left( {1 + \frac{Rf}{1/g_{m}}} \right)} \approx {\frac{1}{g_{m\; 2}g_{m\; 1}R_{2}} + {R_{f}g_{m\; 1}R_{2}}}} \right.$ Note that, in this embodiment, R_(L) is not shunted because the parasitic capacitance C₃ is relatively low. Therefore, the differential circuit 200 is capable of higher frequency operation than the amplifier circuit of FIG. 1.

Referring now to FIG. 10, the input impedance is shown as a function of frequency. The input impedance is relatively flat or constant to a higher frequency (i.e.,

$\left( {{i.e.},\frac{1}{R_{L}C_{3}}} \right)$ as compared to the input impedance for the circuit of FIG. 1. Moreover, in the differential circuit of FIG. 9, the value of the feedback resistance R_(f) can be increased as desired for increased gain because this resistance R_(f) is not limited by the output impedance as in FIG. 1.

Relative to the amplifier circuit of FIG. 1, the output impedance of the amplifier circuits shown in FIGS. 8 and 9 is also increased because the second amplifier 104 has a low transconductance g_(m2) and a high output impedance. Thus, the overall output impedance is not limited by the second amplifier 104, and is merely limited by the load impedance R_(L). The noise of the amplifier circuits 100, 200 is similar to the amplifier circuit of FIG. 1 because the noise of the first amplifier 102 dominates the overall noise for the circuit, and the noise generated by the second amplifier 104 is divided by g_(m1).

Referring now to FIG. 11, the open loop response of the differential circuit of FIG. 9 is illustrated using the open loop response technique described above. As shown therein, at DC, the capacitor C₁ is effectively an open circuit and the input impedance is high, so the DC gain of the open loop response is equal to g_(m1)·R₂. There is a dominant pole at

$\frac{1}{R_{f}C_{1}}$ and the crossover frequency is

$\left( \frac{g_{m1} \cdot R_{2}}{R_{f}C_{1}} \right).$

As compared to the amplifier circuit of FIG. 1, the crossover frequency is determined by the resistance R₂ rather than the load impedance R_(L). Therefore, the resistance R₂ can be increased to increase bandwidth. Further, the crossover frequency is a function of one capacitor C₁ not two. Thus, given the same transconductance g_(m1) as the circuit of FIG. 1, the bandwidth of the differential circuit 200 will be greater. However, there are two nondominant poles at

$\frac{g_{m\; 1}}{C_{2}}\mspace{14mu}{and}\mspace{14mu}{\frac{g_{m\; 2}}{C_{3}}.}$ These poles set an upper limit on the differential circuit's bandwidth.

Referring now to FIG. 12, to mitigate this problem, a capacitor C_(z) can be coupled in parallel across the feedback resistance R_(f) in the differential mode, as shown in the half-circuit illustrated in FIG. 12. The capacitor C₂ adds a zero at a frequency of

$\frac{1}{R_{f}C_{z}}$ as shown in FIG. 11.

Referring now to FIG. 13, the transconductance g_(m1) is noise dependent and is typically set to a level corresponding to minimal noise. Therefore, the transconductance g_(m1) cannot be further increased to further enhance the bandwidth of the differential circuit 200. The feedback resistance R_(f) is set by the input impedance R_(in), so those two variables are generally fixed. As the resistance R₂ is increased to increase bandwidth, at some point the output impedance is affected. This is illustrated in FIG. 13, where it can be seen that the output impedance R_(o) of the differential circuit 200 is relatively constant or flat up to a frequency of approximately

$\frac{1}{R_{2}C_{2}}.$

Moreover, and with further reference to FIG. 11, at a frequency of

${g_{m\; 2} = \frac{R_{2}}{C_{2}}},$ R_(o) increases. Therefore, by increasing the resistance R₂, one of the nondominant poles moves down in frequency, which limits bandwidth. For all of these reasons, the resistance R₂ generally cannot be increased without restraint.

Referring now to FIG. 14, another embodiment of an amplifier circuit is shown that mitigates the problems described above by increasing the transconductance g_(m2) of the second amplifier 104, adding amplifiers 150, 152, and reducing the resistance R₂. In the embodiment of FIG. 14, the transconductance of the amplifier 104 is approximately one-quarter of the amplifier 102. The transconductance of amplifiers 150, 152 are approximately one-twelfth of amplifier 102. As used herein, the term approximately means within +/−0.25% of the designated value.

Referring now to FIGS. 15 and 16, the open loop response of the circuit of FIG. 14 is illustrated using the open loop response technique. Note that three nondominant poles occur at very high frequencies due to fact that the parasitic capacitances C₃, C₄, and C₅ have a relatively low value. The lowest nondominant pole also occurs at a relatively high frequency since the resistance R₂ has a relatively low value. As for the crossover frequency, note that the transconductance g_(m1) is fixed for noise purposes, the feedback resistance R_(f) is fixed by the input impedance R_(in), capacitor C₁ is fixed, and the resistance R₂ is set low for bandwidth purposes. However, transconductances g_(m3) and g_(m4) can be adjusted to further increase bandwidth. Thus, the circuit of FIG. 14 provides even greater flexibility in achieving a high gain, high bandwidth amplifier with other desirable circuit characteristics. In FIG. 16, a differential embodiment of the circuit of FIG. 14 is illustrated. Note that the parasitic capacitances have been omitted in FIG. 16.

Referring now to FIGS. 17 and 18, several exemplary implementations of the multiple amplifier circuit 200 are shown. The multiple amplifier circuit 200 may be any of the multiple amplifier circuits shown in FIGS. 8-16. In FIG. 17, the multiple amplifier circuit 200 according to the present invention is implemented in a read head 202 of a disk drive system 204. In FIG. 18, the multiple amplifier circuit 200 is implemented in a low noise amplifier (LNA) 210 of a wireless device 212. For example, the wireless device 212 may be compliant with Bluetooth networks, cellular networks, and/or Ethernet networks such as 802.11a, 802.11b, 802.11n, 802.11g, 802.16 and/or other present and future wireless standards.

Skilled artisans will appreciate that there are a wide variety of other applications for the multiple amplifier circuit according to the present invention. As can be appreciated, the resistance and capacitances can be implemented in a wide variety of ways including but not limited to discrete elements such as resistors and capacitors, nonlinear variable resistors and capacitors, and/or transistor-based resistances and capacitances. Still other variations are contemplated.

Those skilled in the art can now appreciate from the foregoing description that the broad teachings of the present invention can be implemented in a variety of forms. For example, the present invention can be applied to a wide variety of applications including, for example, CMOS readers. Therefore, while this invention has been described in connection with particular examples thereof, the true scope of the invention should not be so limited since other modifications will become apparent to the skilled practitioner upon a study of the drawings, specification, and the following claims. 

1. A transimpedance amplifier circuit, comprising: a first amplifier having an input, an output and a first transconductance; a second amplifier having an input that communicates with said output of said first amplifier, an output and a second transconductance; a first resistance having one end that communicates with said input of said first amplifier; a third amplifier having an input that communicates with said output of said second amplifier, an output and a third transconductance; a fourth amplifier having an input that communicates with said output of said third amplifier, an output and a fourth transconductance; and an inverter that has an input that communicates with said output of said fourth amplifier and an output that communicates with an opposite end of said first resistance.
 2. The transimpedance amplifier circuit of claim 1 wherein said first transconductance is greater than said second transconductance and said second transconductance is greater than said third and fourth transconductances.
 3. The transimpedance amplifier circuit of claim 1 wherein said second transconductance is approximately equal to one-fourth of said first transconductance and wherein said third and fourth transconductances are approximately equal to one-twelfth of said first transconductance.
 4. The transimpedance amplifier circuit of claim 1 further comprising: a second resistance having one end that communicates with said input of said second amplifier and an opposite end that communicates with said output of said second amplifier; and a third resistance having one end that communicates with said input of said fourth amplifier and an opposite end that communicates with said output of said fourth amplifier.
 5. The transimpedance amplifier of claim 1 further comprising a first capacitance having one end that communicates with said one end of said first resistance and an opposite end that communicates with an opposite end of said first resistance.
 6. The transimpedance amplifier circuit of claim 1 wherein said first, second, third and fourth amplifiers include CMOS amplifiers.
 7. A transimpedance amplifier circuit comprising: first amplifying means for amplifying and having an input, an output and a first transconductance; second amplifying means for amplifying and having an input that communicates with said output of said first amplifying means, an output and a second transconductance; third amplifying means for amplifying and having an input that communicates with said output of said second amplifying means, an output and a third transconductance; fourth amplifying means for amplifying and having an input that communicates with said output of said third amplifying means, an output and a fourth transconductance first resistance means for providing resistance and having one end that communicates with said input of said first amplifying means; and an inverting means for inverting and having has an input that communicates with said output of said fourth amplifying means and an output that communicates with an opposite end of said first resistance means.
 8. The transimpedance amplifying means circuit of claim 7 wherein said first transconductance is greater than said second transconductance and said second transconductance is greater than said third and fourth transconductances.
 9. The transimpedance amplifier circuit of claim 7 wherein said second transconductance is approximately equal to one-fourth of said first transconductance and wherein said third and fourth transconductances are approximately equal to one-twelfth of said first transconductance.
 10. The transimpedance amplifier of claim 7 further comprising first capacitance means for providing capacitance and having one end that communicates with said one end of said first resistance and an opposite end that communicates with an opposite end of said first resistance.
 11. The transimpedance amplifier circuit of claim 7 further comprising: second resistance means for providing resistance and having one end that communicates with said input of said second amplifying means and an opposite end that communicates with said output of said second amplifying means; and third resistance means for providing resistance and having one end that communicates with said input of said fourth amplifying means and an opposite end that communicates with said output of said fourth amplifying means.
 12. The transimpedance amplifier circuit of claim 7 wherein said first, second, third and fourth amplifying means include CMOS transistors. 